Find the equations of the tangent to the given curves at the indicated points:
`y=x^(2)` at (0,0)

Find the equations of the tangent to the given curves at the indicated points: y=x^(3) at (1,1)

Find the equations of the tangent to the given curves at the indicated points: y=x^(4) -6x^(3)+13x^(2)-10x+5 1 at (0,5)

Find the equations of the tangent to the given curves at the indicated points: y=x^(4)-6x^(3)+13x^(2)-10x+5 at (1,3)

Find the equations of the tangent and normal to the given curve at the given points. (iv) y = x^(2) at (0,0).

Find the equations of the tangent and normal to the given curve at the given points. (i) y = x^(4) - 6x^(3) - 10x + 5 at (0,5)

Find the equations of the tangent and normal to the given curve at the given points. (ii) y = x^(4) - 6x^(3) + 13x^(2) - 10x + 5 at (1,3)

Find the equations of the tangent and normal to the given curve at the given points. (iii) y = x^(3) at (1,1)

Find the equations of the tangent and normal to the given curve at the given points. (v) x = cos t, y = sin t at t = (pi)/4

The equation of the tangent to the curve y = x^(3)-2x+1 at the point (1,6) is